Transitive Centralizer and Fibered Partially Hyperbolic Systems

Pub Date : 2024-04-18 DOI:10.1093/imrn/rnae064
Danijela Damjanović, Amie Wilkinson, Disheng Xu
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Abstract

We prove several rigidity results about the centralizer of a smooth diffeomorphism, concentrating on two families of examples: diffeomorphisms with transitive centralizer, and perturbations of isometric extensions of Anosov diffeomorphisms of nilmanifolds. We classify all smooth diffeomorphisms with transitive centralizer: they are exactly the maps that preserve a principal fiber bundle structure, acting minimally on the fibers and trivially on the base. We also show that for any smooth, accessible isometric extension $f_{0}\colon M\to M$ of an Anosov diffeomorphism of a nilmanifold, subject to a spectral bunching condition, any $f\in \textrm{Diff}^{\infty }(M)$ sufficiently $C^{1}$-close to $f_{0}$ has centralizer a Lie group. If the dimension of this Lie group equals the dimension of the fiber, then $f$ is a principal fiber bundle morphism covering an Anosov diffeomorphism. Using the results of this paper, we classify the centralizer of any partially hyperbolic diffeomorphism of a $3$-dimensional, nontoral nilmanifold: either the centralizer is virtually trivial, or the diffeomorphism is an isometric extension of an Anosov diffeomorphism, and the centralizer is virtually ${{\mathbb{Z}}}\times{{\mathbb{T}}}$.
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传递中心器和纤维部分双曲系统
我们证明了关于光滑差分形的中心子的几个刚性结果,并集中讨论了两个系列的例子:具有反式中心子的差分形,以及无芒物的阿诺索夫差分形的等距扩展的扰动。我们对所有具有传递中心性的光滑差分形进行了分类:它们正是保留主纤维束结构的映射,对纤维的作用最小,对基底的作用微不足道。我们还证明,对于任何平滑的、可访问的等距扩展 $f_{0}\colon M\to M$ 的无芒点的阿诺索夫差分形变,在满足谱束化条件的前提下,任何 $f\in \textrm{Diff}^\{infty }(M)$ 足够接近 $C^{1}$ 的 $f_{0}$ 的中心子都是一个李群。如果这个李群的维数等于纤维的维数,那么 $f$ 就是一个覆盖阿诺索夫差分变形的主纤维束变形。利用本文的结果,我们对任何 3$维非口角无芒形的部分双曲衍射的中心子进行了分类:要么中心子实际上是微不足道的,要么衍射是阿诺索夫衍射的等距扩展,并且中心子实际上是 ${{mathbb{Z}}} 的 ${{mathbb{T}}}倍。
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